chapter 4: probabilistic features of certain data distributions pages 93- 111
TRANSCRIPT
Chapter 4:Probabilistic features of certain
data DistributionsPages 93- 111
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• Key words
Probability distribution , random variable , Bernolli distribution, Binomial distribution, Poisson distribution
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The Random Variable (X):
• When the values of a variable (height, weight, or
age) can’t be predicted in advance, the variable is called a random variable.
• An example is the adult height. • When a child is born, we can’t predict exactly his or
her height at maturity.
A random variable, usually written X, is defined as the numerical outcome of random experiment. There are two types of random variables, discrete and continuous.
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4.2 Probability Distributions for Discrete Random Variables
• Definition:The probability distribution of a discrete random variable is a table, graph, formula, or other device used to specify all possible values of a discrete random variable along with their respective probabilities.
The probability that the random variable X has the value x, we write P(X=x)
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The Cumulative Probability Distribution of X, F(x):
It shows the probability that the variable X is less than or equal to a certain value, F(x)= P(X x).
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Example 4.2.1 page 94:F(x)=
P(X≤ x)P(X=x) frequency Number of
Programs
0.2088 0.2088 62 10.3670 0.1582 47 20.4983 0.1313 39 30.6296 0.1313 39 40.8249 0.1953 58 50.9495 0.1246 37 60.9630 0.0135 4 71.0000 0.0370 11 8
1.0000 297 Total
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See figure 4.2.1 page 96See figure 4.2.2 page 97
• Properties of probability distribution of discrete random variable.
1. 2. 3. P(a X b) = P(X b) – P(X a-1) 4. P(X < b) = P(X b-1)
0 ( ) 1P X x ( ) 1P X x
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• Example 4.2.2 page 96: (use table in example 4.2.1)
What is the probability that a randomly selected family will be one who used three assistance programs?
• Example 4.2.3 page 96: (use table in example 4.2.1)
What is the probability that a randomly selected family used either one or two programs?
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• Example 4.2.4 page 98: (use table in example 4.2.1) What is the probability that a family picked at random
will be one who used two or fewer assistance programs?
• Example 4.2.5 page 98: (use table in example 4.2.1) What is the probability that a randomly selected family
will be one who used fewer than four programs?
• Example 4.2.6 page 98: (use table in example 4.2.1) What is the probability that a randomly selected family
used five or more programs?
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• Example 4.2.7 page 98: (use table in example 4.2.1)
What is the probability that a randomly selected family is one who used between three and five programs, inclusive?
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4.3 The Binomial Distribution:
The binomial distribution is one of the most widely encountered probability distributions in applied statistics. It is derived from a process known as a Bernoulli trial.
• Bernoulli trial is : When a random process or experiment called a trial
can result in only one of two mutually exclusive outcomes, such as dead or alive, sick or well, the trial is called a Bernoulli trial.
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The Bernoulli ProcessA sequence of Bernoulli trials forms a Bernoulli process under the following conditions
1- Each trial results in one of two possible, mutually exclusive, outcomes. One of the possible outcomes is denoted (arbitrarily) as a success, and the other is denoted a failure.
2- The probability of a success, denoted by p, remains constant from trial to trial. The probability of a failure, 1-p, is denoted by q.
3- The trials are independent, that is the outcome of any particular trial is not affected by the outcome of any other trial
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• The probability distribution of the binomial random variable X, the number of successes in n independent trials is:
• Where is the number of combinations of n distinct objects taken x of them at a time.
* Note: 0! =1
n
x
!
!( )!
n n
x n xx
! ( 1)( 2)....(1)x x x x
nxqpx
nxXPxf xnx ,...,2,1,0,)()(
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Properties of the binomial distribution
• 1.• 2.• 3.The parameters of the binomial distribution
are n and p• 4.• 5.
( ) 0f x ( ) 1f x
( )E X np
2 var( ) (1 )X np p
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Example 4.3.1 page 100
If we examine all birth records from the North Carolina State Center for Health statistics for year 2001, we find that 85.8 percent of the pregnancies had delivery in week 37 or later (full- term birth).
If we randomly selected five birth records from this population what is the probability that exactly three of the records will be for full-term births?
Exercise: example 4.3.2 page 104
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Example 4.3.3 page 104Suppose it is known that in a certain population 10 percent of the population is color blind. If a random sample of 25 people is drawn from this population, find the probability that
a) Five or fewer will be color blind.b) Six or more will be color blindc) Between six and nine inclusive will be color blind.d) Two, three, or four will be color blind.e) The mean (rate or the average) or the expected numbers.f) The variance.g) The standard deviation.
Exercise: example 4.3.4 page 106.
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4.4 The Poisson Distribution• If the random variable X is the number of
occurrences of some random event in a certain period of time or space (or some volume of matter).
• The probability distribution of X is given by: f (x) =P(X=x) = ,x = 0,1,…..
The symbol e is the constant equal to 2.7183. (Lambda) is called the parameter of the distribution and is the average number of occurrences of the random event in the interval (or volume)
!
x
xe
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Properties of the Poisson distribution
• 1.• 2.• 3.• 4.
( ) 0f x
( ) 1f x
( )E X 2 var( )X
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Example 4.4.1 page 111• In a study of a drug -induced anaphylaxis
among patients taking rocuronium bromide as part of their anesthesia, Laake and Rottingen found that the occurrence of anaphylaxis followed a Poisson model with =12 incidents per year in Norway .Find
1- The probability that in the next year, among patients receiving rocuronium, exactly three will experience anaphylaxis?
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• 2- The probability that less than two patients receiving rocuronium, in the next year will experience anaphylaxis?
• 3- The probability that more than two patients receiving rocuronium, in the next year will experience anaphylaxis?
• 4- The expected value of patients receiving rocuronium, in the next year who will experience anaphylaxis.
• 5- The variance of patients receiving rocuronium, in the next year who will experience anaphylaxis
• 6- The standard deviation of patients receiving rocuronium, in the next year who will experience anaphylaxis
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Example 4.4.2 page 111: Refer to example 4.4.1
• 1-What is the probability that at least three patients in the next year will experience anaphylaxis if rocuronium is administered with anesthesia?
• 2-What is the probability that exactly one patient in the next year will experience anaphylaxis if rocuronium is administered with anesthesia?
• 3-What is the probability that none of the patients in the next year will experience anaphylaxis if rocuronium is administered with anesthesia?
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• 4-What is the probability that at most two patients in the next year will experience anaphylaxis if rocuronium is administered with anesthesia?
• Exercises: examples 4.4.3, 4.4.4 and 4.4.5 pages111-113
• Exercises: Questions 4.3.4 ,4.3.5, 4.3.7 ,4.4.1,4.4.5
Excercices:Q4.3.4: Page 111The same survey data base cited shows that 32 percent of U.S adults indicated that they have been tested for HIV at some points in their life .Consider a simple random sample of 15 adults selected at that time .Find the probability that the number of adults who have beentested for HIV in the sample would be:
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Hint:
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( ) ( ) , 0,1,2,....,X n Xn
f x P X x p q x nx
•(a )Three (Ans. 0.1457)
•(b ) Less than two ) . 0.02477(Ans
(c ) At most one ) . 0.02477Ans (
•(d )At least three (Ans. 0.9038)
(e ) ,between three and five inclusive.
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Q4.3.5 • refer to Q4.3.4 , find the mean and the
variance?
•(Answer: mean = 4.8, • variance =3.264 )
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Q 4.4.3 : •If the mean number of serious accidents per year
in a large factory is five ,find the probability that the current year there will be:
•Hint: f(x)=
•(a ) Exactly seven accidents ) . 0.1044(Ans •(b )Ten or more accidents (ans. 0.0318)
•(c )No accident (Ans. 0.0067)•(d)fewer than five accidents . (ans. 0.4405)
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!x
e x
Q4.4.4
• Find mean and variance and standard •deviation for Q 4.4.3
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4.5 Continuous Probability Distribution
Pages 114 – 127
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• Key words: Continuous random variable, normal
distribution , standard normal distribution , T-distribution
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• Now consider distributions of continuous random variables.
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1- Area under the curve = 1.2- P(X = a) = 0 , where a is a constant.3- Area between two points a , b = P(a<x<b) .
Properties of continuous probability Distributions:
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4.6 The normal distribution:
• It is one of the most important probability distributions in statistics.
• The normal density is given by
• , - ∞ < x < ∞, - ∞ < µ < ∞, σ > 0
• π, e : constants• µ: population mean.• σ : Population standard deviation.
2
2
2
)(
2
1)(
x
exf
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Characteristics of the normal distribution: Page 111
• The following are some important characteristics of the normal distribution:
1- It is symmetrical about its mean, µ.2- The mean, the median, and the mode are all equal. 3- The total area under the curve above the x-axis is
one. 4-The normal distribution is completely determined by
the parameters µ and σ.
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5- The normal distributiondepends on the twoparameters and .mdetermines the location of the curve.(As seen in figure 4.6.3) ,
But, determines the scale of the curve, i.e. the degree of flatness or peakedness of the curve.(as seen in figure 4.6.4)
1 2 3
1 < 2 < 3
1
2
3
1 < 2 < 3
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The Standard normal distribution:
• Is a special case of normal distribution with mean equal 0 and a standard deviation of 1.
• The equation for the standard normal distribution is written as
, - ∞ < z < ∞2
2
2
1)(
z
ezf
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Characteristics of the standard normal distribution
1 -It is symmetrical about 0.2 -The total area under the curve above the x-
axis is one.3 -We can use table (D) to find the probabilities
and areas.
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“How to use tables of Z”Note that The cumulative probabilities P(Z z) are given intables for -3.49 < z < 3.49. Thus, P (-3.49 < Z < 3.49) 1.For standard normal distribution, P (Z > 0) = P (Z < 0) = 0.5
Example 4.6.1:If Z is a standard normal distribution, then1) P( Z < 2) = 0.9772is the area to the left to 2 and it equals 0.9772.
2
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Example 4.6.2:P(-2.55 < Z < 2.55) is the area between
-2.55 and 2.55, Then it equals
P(-2.55 < Z < 2.55) =0.9946 – 0.0054
= 0.9892.
Example 4.6.2: P(-2.74 < Z < 1.53) is the area between
-2.74 and 1.53.
P(-2.74 < Z < 1.53) =0.9370 – 0.0031
= 0.9339.
-2.74 1.53
-2.55 2.550
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Example 4.6.3:P(Z > 2.71) is the area to the right to 2.71.
So,
P(Z > 2.71) =1 – 0.9966 = 0.0034.
Example :
P(Z = 0.84) is the area at z = 0.84.
So,
P(Z = 0.84) = 0
0.84
2.71
Exercise
•Given Standard normal distribution by using the tables:
•4.6.1 :The area to the left of Z=2•4.6.2:
The area under the curve Z =0, Z= 1.434.6.3 : P(Z ≥ 0.55)=
4.6.5 : P(Z < - 2.35)=
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•4.6.7: P( -1.95 < Z < 1.95 )=
4.6.10:P( Z = 1.22)=
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Given the following probabilities, find z1 4.6.11P(Z ≤ z1) = 0.0055 (z1=-2.54)4.6.12P(-2.67≤ Z ≤ z1) = 0.9718 (z1=1.97)4.6.13P(Z > z1) = 0.0384 (z1=1.77)
4.6.11 : P(z1 < Z ≤ 2.98) = 0.1117 (z1=1.21)
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How to transform normal distribution (X) to standard normal distribution (Z)?
• This is done by the following formula:
• Example:• If X is normal with µ = 3, σ = 2. Find the value of
standard normal Z, If X= 6?• Answer:
x
z
5.12
36
x
z
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4.7 Normal Distribution Applications
The normal distribution can be used to model the distribution of many variables that are of interest. This allow us to answer probability questions about these random variables.
Example 4.7.1:The ‘Uptime ’is a custom-made light weight battery-operated
activity monitor that records the amount of time an individual
spend the upright position. In a study of children ages 8 to 15
years. The researchers found that the amount of time children
spend in the upright position followed a normal distribution with
Mean of 5.4 hours and standard deviation of 1.3.Find
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If a child selected at random ,then
1-The probability that the child spend less than 3 hours in the upright position 24-hour period
P( X < 3) = P( < ) = P(Z < -1.85) = 0.0322
-------------------------------------------------------------------------2-The probability that the child spend more than 5 hours in the upright position 24-hour period
P( X > 5) = P( > ) = P(Z > -0.31)
= 1- P(Z < - 0.31) = 1- 0.3520= 0.648-----------------------------------------------------------------------
3-The probability that the child spend exactly 6.2 hours in the upright position 24-hour period
P( X = 6.2) = 0
X
3.1
4.53
X
3.1
4.55
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4-The probability that the child spend from 4.5 to 7.3 hours in the upright position 24-hour period
P( 4.5 < X < 7.3) = P( < < )
= P( -0.69 < Z < 1.46 ) = P(Z<1.46) – P(Z< -0.69)
= 0.9279 – 0.2451 = 0.6828
• Hw…EX. 4.7.2 – 4.7.3
X
3.1
4.55.4 3.1
4.53.7
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• Exercise:
• Questions : 4.7.1, 4.7.2• H.W : 4.7.3, 4.7.4, 4.7.6
Exercises
•Q4.7.1 : For another subject (29-years old male) in the study by Diskin, aceton level were normally distributed with mean of 870 and standard deviation of 211 ppb. Find the probability that in a
given day the subjects acetone level is: •(a )between 600 and 1000 ppb
•(b )over 900 ppb•(c ) 500 ) ( 700 under ppb d At ppb
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• Q4.7.2: In the study of fingerprints an important quantitative characteristic is the total ridge count for the 10 fingers of an individual . Suppose that the total ridge counts of individuals in a certain population are approximately normally distributed with mean of 140 and a standard deviation of 50 .Find the probability that an individual picked at random from this
population will have ridge count of: •( a )200 o r more
• (Answer :0.0985)
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•(b )less than 200 (Answer :0.8849)
•(c )between 100 and 200•(Answer :0.6982)
•(d )between 200 and 250•(Answer :0.0934)
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6.3 The T Distribution:(167-173)
1- It has mean of zero.2- It is symmetric about the mean.3- It ranges from - to .
0
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4- compared to the normal distribution, the t distribution is less peaked in the center and has higher tails.
5- It depends on the degrees of freedom (n-1).6- The t distribution approaches the standard
normal distribution as (n-1) approaches .
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Examplest (7, 0.975) = 2.3646
------------------------------t (24, 0.995) = 2.7696
--------------------------
If P (T(18) > t) = 0.975,
then t = -2.1009
-------------------------
If P (T(22) < t) = 0.99,
then t = 2.508
0.005
t (24, 0.995)
0.995
t (7, 0.975)
0.0250.975
t
0.9750.025
0.990.01
t
•Find: t 0.95,10 = 1.8125
--------------------------------- t 0.975,18 = 2.1009
--------------------------------- t 0.01,20 = - 2.528
--------------------------------- t 0.10,29 = - 1.311
---------------------------------
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